Induction proof: Difference between revisions
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imported>Mathieu m ortho |
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This page explains how to | This page explains how to prove with [[wikipedia:Mathematical induction|induction]] method on the natural number with Rodin tools. | ||
In other words, how to | In other words, how to prove : | ||
<math> | <math> | ||
P(0) | P(0) | ||
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---- | ---- | ||
The proof key is the following theorem: | The proof key is the following theorem: | ||
<math> | <math> | ||
\forall s.s \subseteq \mathbb{N} \land 0 \in s \land (\forall n.n \in s \Rightarrow n+1 \in s)\Rightarrow \mathbb{N} \subseteq s | \forall s.s \subseteq \mathbb{N} \land 0 \in s \land (\forall n.n \in s \Rightarrow n+1 \in s)\Rightarrow \mathbb{N} \subseteq s | ||
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---- | ---- | ||
The proof of the previous theorem is given by | The proof of the previous theorem is given by instantiating the key theorem with : <math> \{x|x\in \mathbb{N} \land P(x)\}</math> | ||
[[Category:Proof patterns]] |
Latest revision as of 14:11, 30 October 2008
This page explains how to prove with induction method on the natural number with Rodin tools. In other words, how to prove :
The proof key is the following theorem:
The proof of the previous theorem is given by instantiating the key theorem with :